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Nov 03'24

Exercise

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Let [math]f[/math] and [math]g[/math] be differentiable complex-valued functions of a real variable. Show that the ordinary product rule for differentiation is still valid; i.e., prove that

[[math]] \ddx (f(x)g(x)) = \left(\ddx f(x)\right)g(x) + f(x)\left(\ddx g(x)\right) . [[/math]]

[Hint: Let [math]f(x) = f_1(x)+if_2(x)[/math] and [math]g(x) = g_1(x) + ig_2(x)[/math], and apply the definitions of the derivative and of multiplication of complex numbers.]